On the metabelian property of quotient groups of solvable groups of orientation-preserving homeomorphisms of the line

Abstract

For the class of solvable groups of homeomorphisms of the line preserving orientation and containing a freely acting element, we establish the metabelianity of the quotient group G/HG, where the elements of the normal subgroup HG are stabilizers of the minimal set. This fact is an important element in the classification theorem, used, in particular, in the study of the Thompson's group F.